Well-structured transition systems form a large class of infinite-state systems, for which safety verification is decidable thanks to a generic backward coverability algorithm. However, for several classes of systems, the generic upper bounds one can extract from the algorithm are far from optimal. In particular, in the case of vector addition systems (VAS) and several of their extensions, the known tight upper bounds were rather derived thanks to ad-hoc arguments based on Rackoff's small witness property. We show how to derive the same bounds directly on the computations of the VAS instantiation of the generic backward coverability algorithm. This relies on a dual view of the algorithm using ideal decompositions of downwards-closed sets...
International audienceKarp and Miller's algorithm is a well-known decision procedure that solves the...
We define Vector Addition with Sates and Split/Join Transitions, a new model that extends VASS and B...
Reachability and boundedness problems have been shown decidable for Vector Addition Systems with one...
Journal version of https://hal.inria.fr/hal-01176755International audienceWell-structured transition...
International audienceWell-structured transition systems form a large class of infinite-state system...
Abstract. Rackoff’s small witness property for the coverability problem is the standard means to pro...
Seminal results establish that the coverability problem for Vector Addition Systems with States (VAS...
Many infinite state systems can be seen as well-structured transition systems (WSTS), i.e., systems ...
Many infinite state systems can be seen as well-structured transition systems (WSTS), i.e., systems ...
AbstractIn this paper, we present a general algorithmic schema called ‘Expand, Enlarge and Check’ fr...
Branching VASS (BVASS) generalise vector addition systems with states by allowing for special branch...
Branching VASS (BVASS) generalise vector addition systems with states by allowing for special branch...
In this paper, we present a general algorithmic schema called 'Expand, Enlarge and Check' from which...
Abstract. We give an incremental, inductive (IC3) procedure to check coverability of well-structured...
The covering and boundedness problems for branching vector addition systems are shown complete for d...
International audienceKarp and Miller's algorithm is a well-known decision procedure that solves the...
We define Vector Addition with Sates and Split/Join Transitions, a new model that extends VASS and B...
Reachability and boundedness problems have been shown decidable for Vector Addition Systems with one...
Journal version of https://hal.inria.fr/hal-01176755International audienceWell-structured transition...
International audienceWell-structured transition systems form a large class of infinite-state system...
Abstract. Rackoff’s small witness property for the coverability problem is the standard means to pro...
Seminal results establish that the coverability problem for Vector Addition Systems with States (VAS...
Many infinite state systems can be seen as well-structured transition systems (WSTS), i.e., systems ...
Many infinite state systems can be seen as well-structured transition systems (WSTS), i.e., systems ...
AbstractIn this paper, we present a general algorithmic schema called ‘Expand, Enlarge and Check’ fr...
Branching VASS (BVASS) generalise vector addition systems with states by allowing for special branch...
Branching VASS (BVASS) generalise vector addition systems with states by allowing for special branch...
In this paper, we present a general algorithmic schema called 'Expand, Enlarge and Check' from which...
Abstract. We give an incremental, inductive (IC3) procedure to check coverability of well-structured...
The covering and boundedness problems for branching vector addition systems are shown complete for d...
International audienceKarp and Miller's algorithm is a well-known decision procedure that solves the...
We define Vector Addition with Sates and Split/Join Transitions, a new model that extends VASS and B...
Reachability and boundedness problems have been shown decidable for Vector Addition Systems with one...